vektorlögmál

Vektorlögmál, often translated as vector calculus or vector field theory, is a branch of mathematics that studies vector fields. A vector field assigns a vector to each point in space. This concept is fundamental in many areas of physics and engineering. Key operations in vector calculus include the gradient, divergence, and curl, which describe how scalar and vector fields change in space. The gradient of a scalar field produces a vector field, indicating the direction and magnitude of the greatest rate of increase. The divergence of a vector field measures the extent to which the field flows outward from a point, while the curl measures the tendency of the field to rotate around a point. These operations are formalized using differential operators.

Integral theorems in vector calculus, such as the divergence theorem and Stokes' theorem, relate the behavior